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Question
Let ‘O’ be any point in the interior of ΔACB. Prove that:
- AB + AC > OB + ОС
- AB + BC + CA > (OA + OB + OC)
- AB + BC + CA < 2(OA + OB + ОС)
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Solution
Given: O is any point in the interior of ΔACB.
To Prove:
- AB + AC > OB + OC
- AB + BC + CA > (OA + OB + OC)
- AB + BC + CA < 2(OA + OB + OC)
Proof [Step-wise]:
a. AB + AC > OB + OC
1. Let the line BO meet AC at D.
Since O is interior, B, O and D are collinear with O between B and D.
2. In ΔABD, by the triangle inequality:
AB + AD > BD.
But BD = BO + OD,
So, AB + AD > BO + OD. ...(1)
3. In ΔODC, by the triangle inequality:
OD + DC > OC. ...(2)
4. Add (1) and (2):
AB + AD + OD + DC > BO + OD + OC.
Cancel AD + DC = AC and OD from both sides to get AB + AC > BO + OC.QED.
b. AB + BC + CA > OA + OB + OC
1. Apply part (a) and its cyclic versions by the same construction for the other vertices:
AB + AC > OB + OC,
BC + BA > OC + OA,
CA + CB > OA + OB.
2. Add the three inequalities:
2(AB + BC + CA) > 2(OA + OB + OC)
Divide by 2 to obtain AB + BC + CA > OA + OB + OC.QED.
c. AB + BC + CA < 2(OA + OB + OC)
1. In ΔOAB: OA + OB > AB.
In ΔOBC: OB + OC > BC.
In ΔOCA: OC + OA > CA.
2. Add these three inequalities:
2(OA + OB + OC) > AB + BC + CA,
i.e. AB + BC + CA < 2(OA + OB + OC).QED.
All three inequalities are proved:
- AB + AC > OB + OC,
- AB + BC + CA > OA + OB + OC,
- AB + BC + CA < 2(OA + OB + OC).
